Generalized Naming Game and Bayesian Naming Game as Dynamical Systems

Abstract

We study the β-model (β-NG) and the Bayesian Naming Game (BNG) as dynamical systems. By applying linear stability analysis to the dynamical system associated with the β-model, we demonstrate the existence of a non-generic bifurcation with a bifurcation point βc = 1/3. As β passes through βc, the stability of isolated fixed points changes, giving rise to a one-dimensional manifold of fixed points. Notably, this attracting invariant manifold forms an arc of an ellipse. In the context of the BNG, we propose modeling the Bayesian learning probabilities pA and pB as logistic functions. This modeling approach allows us to establish the existence of fixed points without relying on the overly strong assumption that pA = pB = p, where p is a constant.